Parabola Parts

1. Equation of Ellipse (1) Parabola Parts Equation of Ellipse (2) Parabola (Up\Down) Hyperbola (Left Right) Parabola (Left\Right) Hyperbola (Up Down) Equation of Parabola (Vertex, Focus) Equation of Hyperbola (1) Equation of Parabola (Vert, Direct) Equation of Hyperbola (2) Equation (Line tangent to circle at a point) Ellipse (Tall) Please report any errors ASAP by email to sakim@fjuhsd.net or IM at kimtroymath. Problems may be more difficult on test. Consult homework assignment. Not all topics covered. Ellipse (Wide)

2. Up\down parabola Right (pos)\Left(neg) parabola Vertex Focus Directrix Axis of Symmetry How to graph 1) Opens 2) Vertex, aos 3) Find p 4) Focus 5) Directrix Focus – On a.o.s., is inside the parabola Directrix – perpendicular to a.o.s, is outside the parabola All points on the parabola are equidistant from the focus and the directrix 6) Latus Rectum = |4p| through focus

3. How to graph 1) Opens 2) Vertex\aos 3) Find p 4) Focus 5) Directrix Down (3, 4); x = 3 p = -2 (3, 4 + (-2)) = (3, 2) x = 3 y = 6 y = 4 – (-2)  y = 6 (3, 4) Latus Rectum |4p| = 8 (3, 2) Don’t have to necessarily memorize, just think about these.

4. 1) Opens 2) Vertex, aos 3) Find p 4) Focus 5) Directrix Right (-5,-2), y = -2 (-5,-2) Latus Rectum y = -2 |4p| = 1\2 Don’t have to necessarily memorize, just think about these.

5. Equation of parabola given vertex and focus. Vertex (2,1) Focus (4,1) 1) Opening 2) Vertex 3) Find p 4) Plug in parts

6. Equation of parabola given vertex and directrix. Vertex (2,-3) Directrix y = 1) Opening 2) Vertex 3) Find p 4) Plug in parts

7. Equation of tangent line given center, point • Find center • Other point • 2) Find slope • 3) Perp Slope • 4) Eq of line (3, -1) (x - 3)2 + (y + 1)2 = 20 (5, 3) (5,3) is point on circle

8. 1) Tall or Wide? • 2) Find center • Find a and plot • Find b and plot • Find c and plot

9. 1) Tall or Wide? • 2) Find center • Find a and plot • Find b and plot • Find c and plot

10. NOTE: If you have a and b, you don’t need c Vertices: (4,0), (-2,0) Foci: (2,0), (0,0) 1 – Find Center 2 – Tall or Wide 3 – Find a: b: c: 4 – Find what you don’t have 5 – Plug it in

11. NOTE: If you have a and b, you don’t need c Co-Vertices: (5,-1), (-3,-1) Foci: (1,8), (1,-10) 1 – Find Center 2 – Tall or Wide 3 – Find a: b: c: 4 – Find what you don’t have 5 – Plug it in

12. Steps 1 – Find Center 2 – Find a and plot 3 – Find b and plot 4 – Make box and sketch asymptotes 5 – Find c, foci 6 – Sketch 7 – Equation of asymptotes

13. Steps 1 – Find Center 2 – Find a and plot 3 – Find b and plot 4 – Make box and sketch asymptotes 5 – Find c, foci 6 – Sketch 7 – Equation of asymptotes

14. Vertices: (4,0), (-2,0) Foci: (5,0), (-3,0) 1 – Find Center 2 – Up\Down, or Left\Right 3 – Find a: b: c: 4 – Find what you don’t have 5 – Plug it in

15. Vertices: (1,-3), (1,5) Foci: (1,-5), (1,7) 1 – Find Center 2 – Up\Down, or Left\Right 3 – Find a: b: c: 4 – Find what you don’t have 5 – Plug it in